English

Inversion dans les tournois

Combinatorics 2010-07-14 v1

Abstract

We consider the transformation reversing all arcs of a subset XX of the vertex set of a tournament TT. The \emph{index} of TT, denoted by i(T)i(T), is the smallest number of subsets that must be reversed to make TT acyclic. It turns out that critical tournaments and (1)(-1)-critical tournaments can be defined in terms of inversions (at most two for the former, at most four for the latter). We interpret i(T)i(T) as the minimum distance of TT to the transitive tournaments on the same vertex set, and we interpret the distance between two tournaments TT and TT' as the \emph{Boolean dimension} of a graph, namely the Boolean sum of TT and TT'. On nn vertices, the maximum distance is at most n1n-1, whereas i(n)i(n), the maximum of i(T)i(T) over the tournaments on nn vertices, satisfies n12log2ni(n)n3\frac {n-1}{2} - \log_{2}n \leq i(n) \leq n-3, for n4n \geq 4. Let Im<ω \mathcal{I}_{m}^{< \omega} (resp. Imω\mathcal{I}_{m}^{\leq \omega}) be the class of finite (resp. at most countable) tournaments TT such that i(T)mi(T) \leq m. The class Im<ω\mathcal {I}_{m}^{< \omega} is determined by finitely many obstructions. We give a morphological description of the members of I1<ω\mathcal {I}_{1}^{< \omega} and a description of the critical obstructions. We give an explicit description of an universal tournament of the class Imω\mathcal{I}_{m}^{\leq \omega}.

Keywords

Cite

@article{arxiv.1007.2103,
  title  = {Inversion dans les tournois},
  author = {Houmem Belkhechine and Moncef Bouaziz and Imed Boudabbous and Maurice Pouzet},
  journal= {arXiv preprint arXiv:1007.2103},
  year   = {2010}
}

Comments

6 pages

R2 v1 2026-06-21T15:47:31.601Z